Converting recurring decimals to fractions is like turning a never-ending song into a simple tune you can sing along to.
Imagine you have a decimal that repeats forever, like 0.333..., where the 3 keeps going and going. You want to find out what fraction makes this repeating decimal, just like finding out how many slices of pizza make up a whole pie.
The Secret Recipe
Here's the trick: let’s call your recurring decimal something simple, like x. So if we say x = 0.333..., then multiply both sides by 10 (because there’s one repeating digit), you get 10x = 3.333...
Now subtract the original equation from this new one:
10x - x = 3.333... - 0.333...That gives you:
9x = 3Then, divide both sides by 9, and you find that x = 3/9, which simplifies to 1/3.
So just like turning a long song into one simple note, or a repeating decimal into a neat fraction, this method helps you make sense of something that seems endless.
Examples
- Converting 0.333... into 1/3
- Making 0.666... become 2/3
- Changing 0.1666... to 1/6
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See also
- How Does Recurring Decimals | Number | Maths | FuseSchool Work?
- What is 1/50th?
- What is 10 out of 13 seats?
- Why Some Decimals Repeat and Others Don't?
- What Is the Golden Rectangle?